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I have a homework about random graphs. I can't understand the question. Can anyone please clarify to me what I am supposed to do?

Let N be a positive integer and p be a number between 0 and 1. An (N, p) random graph is a graph generated by the following procedure:

Draw N vertices, denoted by 1, 2, . . . , N respectively; for every pair (u, v) of different vertices, with probability p, connect the two vertices with an edge. A graph is said to be connected if there is a path between any two vertices.

In this lab, you will write code to generate large random graphs and investigate the connectedness of such graphs.

We will fix N to be 500,000 but let p vary in {0.05, 0.10, 0.15, ..., 0.95}. For each value of p, you need to create 100 (N, p) random graphs. You need to develop a method (and of course implement it in your program) to determine if a graph is connected. Then for each value of p, you need to count the number M of random graphs that are connected, and investigate the relationship between M (which reflects the probability that a random graph is connected) and p.

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2  
What isn't clear, exactly? –  StoryTeller Nov 29 '12 at 23:05
    
I don't get what a random graph is. Is it just like a normal graph? If it is, I can't imagine how the vertices can be connected in more than one way. –  user1864733 Nov 29 '12 at 23:14
    
From reading the quesiton it seems that once constructed it is a regular graph. It's the construction that has a non-deterministic element to it. –  StoryTeller Nov 29 '12 at 23:17

1 Answer 1

A random graph is a graph that is randomly created:

Pseudo-code

for i := 1 to N
   for j := i+1 to N
       if bernoulli_distributed_with_param_p is true
           add undirected edge {i,j} to graph

The parameter p is simply the probability that two given vertices are connected. bernoulli_distributed_with_param_p is actually pretty simple to implement in C:

// Returns 0 with probability (1-p)
int bernoulli_distributed(double p){
    return (p > ((double)rand())/RAND_MAX);
}

Don't forget that you need to initialize the random generator with srand.

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Thank you very much. I was just gonna implement the function. One question: Why did you use a RAND_MAX instead of using modulo? –  user1864733 Nov 29 '12 at 23:28
    
I solved the problem using your pseudocode, but it is taking forever. How can I solve it more efficiently? Keep in mind that N = 500,000. –  user1864733 Nov 29 '12 at 23:47
    
@user1864733: 1.: I divided by RAND_MAX to get a value between 0 and 1. 2.: You can't. The algorithm itself has a lower bound of Omega(n^2), because you need to check every pair, and there are \sum_{i=1}^N N - i = \sum_{i=0}^{N-1} i = (N - 1)(N - 2)/2 pairs. However, it is important that your data structure provides a mechanism to add an edge in constant time (O(1)), otherwise you'll get a even worse runtime complexity. Maybe you should add your graph data structure to your question. –  Zeta Nov 30 '12 at 5:45

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